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(A)In Terms of Polar Coordinates R And $\theta$ , Describe the Field Lines of the Conservative Plane Vector

Question 21

Multiple Choice

(a) In terms of polar coordinates r and $\theta$ , describe the field lines of the conservative plane vector field F(x,y) = x i + y j.
(b) In terms of polar coordinates r and $\theta$ , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j.

A) (a) radial lines $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ (b) circles r = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$
B) (a) circles r = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ (b) radial lines $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$
C) (a) circles r = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ sin( $\theta$ ) (b) circles r = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ cos( $\theta$ )
D) (a) lines r cos $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ (b) lines r sin $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$
E) (a) lines r cos $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$ (b) radial lines $\theta$ = $(a) In terms of polar coordinates r and \theta , describe the field lines of the conservative plane vector field F(x,y) = x i + y j. (b) In terms of polar coordinates r and \theta , describe the equipotential curves of the conservative plane vector field F(x,y) = x i + y j. A) (a) radial lines \theta = (b) circles r = B) (a) circles r = (b) radial lines \theta = C) (a) circles r = sin( \theta ) (b) circles r = cos( \theta ) D) (a) lines r cos \theta = (b) lines r sin \theta = E) (a) lines r cos \theta = (b) radial lines \theta =$